关于曲率的深入研究

本文就曲线上一点处曲率的存在条件做了讨论,提出了曲率存在的一个定理,给出了单侧曲率的概念,从而说明了曲率并非在光滑曲线上的每一点处都存在.     

常曲率空间中的正曲率子流形

本文研究了常曲率空间子流表余维数减少的问题，说明了在一定条件下，余维数可以减少到１。     

具有调和曲率与有限$L^p$曲率的完备流形

Let(M~n, g)(n ≥ 3) be an n-dimensional complete Riemannian manifold with harmonic curvature and positive Yamabe constant. Denote by R and R?m the scalar curvature and the trace-free Riemannian curvature tensor of M, respectively. The main result of this paper states that R?m goes to zero uniformly at infinity if for p ≥ n, the L~p-norm of R?m is finite.As applications, we prove that(M~n, g) is compact if the L~p-norm of R?m is finite and R is positive, and(M~n, g) is scalar flat if(M~n, g) is a complete noncompact manifold with nonnegative scalar curvature and finite L~p-norm of R?m. We prove that(M~n, g) is isometric to a spherical space form if for p ≥n/2, the L~p-norm of R?m is sufficiently small and R is positive.In particular, we prove that(M~n, g) is isometric to a spherical space form if for p ≥ n, R is positive and the L~p-norm of R?m is pinched in [0, C), where C is an explicit positive constant depending only on n, p, R and the Yamabe constant.     

有关法曲率的若干性质

以[2]中经典微分几何问题为切入点,运用复数与三角工具广泛深入地探讨了“过曲面上一点有n条切线,若相邻两条切线的交角为2nπ,曲面法线与切线所定平面截得曲线的曲率半径为ρ1,ρ2,ρ3,…,ρn时,∑ni=11ρim,∑ni=1ρi,∏ni=1ρi的结果”,得到了法曲率与相关的三个有趣定理.     

高维常平均曲率超曲面的数量曲率的空隙

本文证明了当高维球面中闭常平均曲率超曲面Ｍ＾ｎ的平均曲率│Ｈ│＜Ｃ（ｎ）时，若Ｍ的数量曲率Ｒ为常数，则Ｒ不属于［ａ（ｎ，Ｈ），ａ（ｎ，Ｈ）＋ｎ／４），其中ａ（ｎ，Ｈ）＝ｎ（ｎ－９／４）＋ｎ＾２（ｎ－２）／２（ｎ－１）Ｈ＾２－ｎ（ｎ－２）／２（ｎ－１）√ｎ＾２Ｈ＾４＋４（ｎ－１）Ｈ＾２。     

李奇曲率平行的黎曼流形的曲率张量模长

李安民和赵国松［１］提出了下面的问题：找出李奇曲率平行的黎曼流形的曲率张量模长的最佳拼挤常数并确定达到该值的流形．本文确定了非爱因斯坦流形的最佳拼挤常数和达到该值的黎曼流形．在ｎ１２时，回答了［１］中提出的问题．     

具有平行平均曲率向量子流形的曲率估计与稳定性

本文估计空间形式中具有平行平均曲率向量子流形上共形度量的数量曲率上界,并利用其研究了具有常平均曲率超曲面的稳定性．     

曲面上的曲率新讲

阐述一种讲解曲面上的各种曲率形式的新教学模式.我们利用平面向量分析,矩阵,求导运算等工具推导出所有的结论和公式.这种新观点和方法避免了微分几何传统讲法中使用Weingarten映射及其特征值的思路,而较之更加直观明了.     

常平均曲率超曲面的曲率估计与稳定性

本文估计了空间形式Ｎ^ｎ＋１（ｃ）中常平均曲率超曲面上共形度量的曲率上界,并用其研究了Ｎ^ｎ＋１（ｃ）中常平均曲率超曲面的强稳定性．     

完备正曲率凯拉流形的体积增长与曲率衰减

在C~n上构造了一族全纯截曲率为正的凯拉度量,并证明所构造的度量具有如下性质：当测地距离ρ趋于无穷时,测地球的体积增长为O(■),而黎曼标量曲率的衰减为O(■),其中β≥0．     

Curvature Symmetries

An alternative construction of Riemann curvature appeared in Acta Appl. Math. 59 (1999), 215–227, with a promise of a short direct proof of its symmetries. The present Section 5 repairs a flaw in the original Section 5, with the promised proof.     

Complete Hypersurfaces with Constant Mean Curvature and Finite Total Curvature

The main result of this paper states that the traceless second fundamental tensor A⁰ of an n-dimensional complete hypersurface M, with constant mean curvature H and finite total curvature, _M |A⁰|ⁿ dv_M < , in a simply-connected space form (c), with non-positive curvature c, goes to zero uniformly at infinity. Several corollaries of this result are considered: any such hypersurface has finite index and, in dimension 2, if H ² + c > 0, any such surface must be compact.     

The Total Mean Curvature of a Complete Noncompact Surface of Nonnegative Curvature in R3

We give a complete classification of complete noncompact oriented surfaces with nonnegative Gaussian curvature and finite total mean curvature in R³.     

On Einstein Manifolds of Positive Sectional Curvature

Let (M, g) be a compact oriented four-dimensional Einstein manifold. If M has positive intersection form and g has non-negative sectional curvature, we show that, up to rescaling and isometry, (M, g) is ₂, with its standard Fubini–Study metric.     

拟常曲率空间中具有常平均曲率的完备超曲面

主要研究了拟常曲率空间中具有常平均曲率的完备超曲面,得到了这类超曲面全脐的一个结果.即若Nn+1的生成元η∈TM,且a-2|b|=c(常数)>0,则当S<2 n-1~(1/2)(a-2|b|)时,M为全脐超曲面.     

拟常曲率流形中有平行平均曲率向量的子流形

研究了拟常曲率流形中具有平行平均曲率向量的子流形,给出了两个积分不等式.